Triangle in 2D
(the database of solved problems)
All the problems and solutions shown below were generated using the Triangle Calculator.
| ID |
Problem |
Count |
| 1401 | Find the area of triangle $A=\left(2,~5\right)$ $B=\left(-4,~1\right)$ $C=\left(6,~3\right)$. | 2 |
| 1402 | Find the centroid of triangle $A=\left(3.4365,~0\right)$ $B=\left(-0.4365,~0\right)$ $C=\left(0,~3\right)$. | 2 |
| 1403 | Find the area of triangle $A=\left(-1,~0\right)$ $B=\left(0,~-2\right)$ $C=\left(3,~1\right)$. | 2 |
| 1404 | Find the area of triangle $A=\left(5,~-1\right)$ $B=\left(3,~-2\right)$ $C=\left(0,~-1\right)$. | 2 |
| 1405 | Find the centroid of triangle $A=\left(5,~-1\right)$ $B=\left(3,~-2\right)$ $C=\left(0,~-1\right)$. | 2 |
| 1406 | Find the incenter of triangle $A=\left(5,~-1\right)$ $B=\left(3,~-2\right)$ $C=\left(0,~-1\right)$. | 2 |
| 1407 | Find the circumcenter of triangle $A=\left(5,~-1\right)$ $B=\left(3,~-2\right)$ $C=\left(0,~-1\right)$. | 2 |
| 1408 | Find the incenter of triangle $A=\left(1,~2\right)$ $B=\left(3,~-2\right)$ $C=\left(5,~6\right)$. | 2 |
| 1409 | Find the circumcenter of triangle $A=\left(1,~2\right)$ $B=\left(3,~-2\right)$ $C=\left(5,~6\right)$. | 2 |
| 1410 | Find the altitudes of triangle $A=\left(1,~2\right)$ $B=\left(3,~-2\right)$ $C=\left(5,~6\right)$. | 2 |
| 1411 | Find the area of triangle $A=\left(-3,~1\right)$ $B=\left(1,~2\right)$ $C=\left(-3,~4\right)$. | 2 |
| 1412 | Find the circumcenter of triangle $A=\left(-3,~1\right)$ $B=\left(1,~2\right)$ $C=\left(-3,~4\right)$. | 2 |
| 1413 | Find the circumcenter of triangle $A=\left(2,~2\right)$ $B=\left(2,~-2\right)$ $C=\left(6,~-2\right)$. | 2 |
| 1414 | Find the circumcenter of triangle $A=\left(6,~4\right)$ $B=\left(6,~2\right)$ $C=\left(10,~2\right)$. | 2 |
| 1415 | Find the area of triangle $A=\left(1,~-2\right)$ $B=\left(5,~4\right)$ $C=\left(-2,~0\right)$. | 2 |
| 1416 | Find the circumcenter of triangle $A=\left(1,~-2\right)$ $B=\left(5,~4\right)$ $C=\left(-2,~0\right)$. | 2 |
| 1417 | Find the altitudes of triangle $A=\left(1,~-2\right)$ $B=\left(5,~4\right)$ $C=\left(-2,~0\right)$. | 2 |
| 1418 | Find the area of triangle $A=\left(-2,~5\right)$ $B=\left(-6,~1\right)$ $C=\left(0,~3\right)$. | 2 |
| 1419 | Find the orthocenter of triangle $A=\left(-2,~5\right)$ $B=\left(-6,~1\right)$ $C=\left(0,~3\right)$. | 2 |
| 1420 | Find the circumcenter of triangle $A=\left(-2,~5\right)$ $B=\left(-6,~1\right)$ $C=\left(0,~3\right)$. | 2 |
| 1421 | Find the medians of triangle $A=\left(-2,~5\right)$ $B=\left(-6,~1\right)$ $C=\left(0,~3\right)$. | 2 |
| 1422 | Find the medians of triangle $A=\left(-2,~1\right)$ $B=\left(3,~1\right)$ $C=\left(1,~5\right)$. | 2 |
| 1423 | Find the altitudes of triangle $A=\left(-2,~1\right)$ $B=\left(3,~1\right)$ $C=\left(1,~5\right)$. | 2 |
| 1424 | Find the area of triangle $A=\left(3,~3\right)$ $B=\left(-5,~6\right)$ $C=\left(-11,~-10\right)$. | 2 |
| 1425 | Find the area of triangle $A=\left(6,~-1\right)$ $B=\left(-8,~-5\right)$ $C=\left(-3,~4\right)$. | 2 |
| 1426 | Find the altitudes of triangle $A=\left(-1,~0\right)$ $B=\left(0,~-2\right)$ $C=\left(4,~1\right)$. | 2 |
| 1427 | Find the area of triangle $A=\left(-1,~0\right)$ $B=\left(0,~-2\right)$ $C=\left(4,~1\right)$. | 2 |
| 1428 | Find the medians of triangle $A=\left(-5,~-2\right)$ $B=\left(1,~-5\right)$ $C=\left(6,~5\right)$. | 2 |
| 1429 | Find the centroid of triangle $A=\left(-9,~2\right)$ $B=\left(5,~-3\right)$ $C=\left(-11,~-12\right)$. | 2 |
| 1430 | Find the altitudes of triangle $A=\left(2,~3\right)$ $B=\left(3,~7\right)$ $C=\left(6,~-5\right)$. | 2 |
| 1431 | Find the incenter of triangle $A=\left(1,~8\right)$ $B=\left(3,~2\right)$ $C=\left(7,~5\right)$. | 2 |
| 1432 | Find the area of triangle $A=\left(25,~10\right)$ $B=\left(25,~-5\right)$ $C=\left(-5,~-5\right)$. | 2 |
| 1433 | Find the area of triangle $A=\left(-5,~10\right)$ $B=\left(0,~-3\right)$ $C=\left(0,~6\right)$. | 2 |
| 1434 | Find the area of triangle $A=\left(-3,~2\right)$ $B=\left(-3,~-4\right)$ $C=\left(2,~-4\right)$. | 2 |
| 1435 | Find the incenter of triangle $A=\left(2,~5\right)$ $B=\left(3,~\dfrac{ 1 }{ 2 }\right)$ $C=\left(\dfrac{ 15 }{ 2 },~\dfrac{ 9 }{ 2 }\right)$. | 2 |
| 1436 | Find the incenter of triangle $A=\left(2,~5\right)$ $B=\left(3,~\dfrac{ 1 }{ 2 }\right)$ $C=\left(\dfrac{ 15 }{ 2 },~7\right)$. | 2 |
| 1437 | Find the centroid of triangle $A=\left(1,~3\right)$ $B=\left(-2,~-2\right)$ $C=\left(5,~-1\right)$. | 2 |
| 1438 | Find the area of triangle $A=\left(2,~3\right)$ $B=\left(5,~4\right)$ $C=\left(3,~7\right)$. | 2 |
| 1439 | Find the altitudes of triangle $A=\left(6,~5\right)$ $B=\left(-3,~5\right)$ $C=\left(-3,~-2\right)$. | 2 |
| 1440 | Find the incenter of triangle $A=\left(2,~3\right)$ $B=\left(5,~4\right)$ $C=\left(3,~7\right)$. | 2 |
| 1441 | Find the area of triangle $A=\left(0,~0\right)$ $B=\left(2,~3\right)$ $C=\left(8,~0\right)$. | 2 |
| 1442 | Find the area of triangle $A=\left(4,~5\right)$ $B=\left(-3,~2\right)$ $C=\left(5,~-2\right)$. | 2 |
| 1443 | Find the area of triangle $A=\left(-7,~-6\right)$ $B=\left(2,~-4\right)$ $C=\left(0,~0\right)$. | 2 |
| 1444 | Find the circumcenter of triangle $A=\left(0,~0\right)$ $B=\left(0,~60\right)$ $C=\left(\sqrt{ 1300 },~30\right)$. | 2 |
| 1445 | Find the area of triangle $A=\left(-5,~8\right)$ $B=\left(-9,~-4\right)$ $C=\left(-1,~-4\right)$. | 2 |
| 1446 | Find the area of triangle $A=\left(-4,~-5\right)$ $B=\left(3,~10\right)$ $C=\left(6,~12\right)$. | 2 |
| 1447 | Find the altitudes of triangle $A=\left(-4,~-5\right)$ $B=\left(3,~10\right)$ $C=\left(6,~12\right)$. | 2 |
| 1448 | Find the medians of triangle $A=\left(4,~7\right)$ $B=\left(-3,~3\right)$ $C=\left(11,~-1\right)$. | 2 |
| 1449 | Find the medians of triangle $\left(4,~0\right)$ $\left(-4,~16\right)$ $\left(18,~20\right)$. | 2 |
| 1450 | Find the orthocenter of triangle $\left(-90,~28\right)$ $\left(0,~-35\right)$ $\left(125,~20\right)$. | 2 |
